图上极大算子的自伴随约束

IF 0.5 Q3 MATHEMATICS
L. K. Zhapsarbaeva, B. Kanguzhin, M. N. Konyrkulzhaeva
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引用次数: 0

摘要

. 本文研究了任意无环几何图上的微分算子。我们将区间上的微分算子的已知结果推广到图上的微分算子。为了正确地定义给定图上的极大算子,我们需要选择一组边界顶点。非边界顶点称为内顶点。我们强调图上的极大算子不仅由给定的边缘上的微分表达式决定,而且由图内顶点上的Kirchhoff条件决定。对于引入的极大算子,我们证明了拉格朗日公式的一个类似形式。给出了一种构造任意一组边界条件的伴随边界形式的算法。在本文的结论部分,我们给出了极大算子的所有自伴随约束的完整描述。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Self-adjoint restrictions of maximal operator on graph
. In the work we study differential operators on arbitrary geometric graphs without loops. We extend the known results for differential operators on an interval to the differential operators on the graphs. In order to define properly the maximal operator on a given graph, we need to choose a set of boundary vertices. The non-boundary vertices are called interior vertices. We stress that the maximal operator on a graph is determined not only by the given differential expressions on the edges, but also by the Kirchhoff conditions at the interior vertices of the graph. For the introduced maximal operator we prove an analogue of the Lagrange formula. We provide an algorithm for constructing adjoint boundary forms for an arbitrary set of boundary conditions. In the conclusion of the paper, we present a complete description of all self-adjoint restrictions of the maximal operator.
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CiteScore
1.10
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